DOUBLE-ANGLE, POWER-REDUCING, AND HALF-ANGLE …

DOUBLE-ANGLE, POWER-REDUCING, AND HALF-ANGLE FORMULAS

Introduction

? Another collection of identities called double-angles and half-angles, are acquired from the sum and difference identities in section 2 of this chapter.

? By using the sum and difference identities for both sine and cosine, we are able to compile different types of double-angles and half angles

? First we are going to concentrate on the double angles and examples.

Double-Angles Identities

? Sum identity for sine:

sin (x + y) = (sin x)(cos y) + (cos x)(sin y) sin (x + x) = (sin x)(cos x) + (cos x)(sin x) sin 2x = 2 sin x cos x

(replace y with x)

Double-angle identity for sine.

? There are three types of double-angle identity for cosine, and we use sum identity for cosine, first:

cos (x + y) = (cos x)(cos y) ? (sin x)(sin y)

cos (x + x) = (cos x)(cos x) ? (sin x)(sin x) cos 2x = cos2 x ? sin2 x

(replace y with x)

First double-angle identity for cosine

? use Pythagorean identity to substitute into the first double-angle.

sin2 x +cos2 x = 1 cos2 x = 1 ? sin2 x

cos 2x = cos2 x ? sin2 x cos 2x = (1 ? sin2 x) ? sin2 x cos 2x = 1 ? 2 sin2 x

(substitute)

Second double-angle identity for cosine.

by Shavana Gonzalez

Double-Angles Identities (Continued)

? take the Pythagorean equation in this form, sin2 x = 1 ? cos2 x and substitute into the First double-angle identity cos 2x = cos2 x ? sin2 x cos 2x = cos2 x ? (1 ? cos2 x) cos 2x = cos2 x ? 1 + cos2 x cos 2x = 2cos2 x ? 1 Third double-angle identity for cosine.

Summary of Double-Angles

? Sine: sin 2x = 2 sin x cos x

? Cosine: cos 2x = cos2 x ? sin2 x = 1 ? 2 sin2 x = 2 cos2 x ? 1

? Tangent: tan 2x = 2 tan x/1- tan2 x = 2 cot x/ cot2 x -1 = 2/cot x ? tan x tangent double-angle identity can be accomplished by applying the same methods, instead use the sum identity for tangent, first.

? Note: sin 2x 2 sin x; cos 2x 2 cos x; tan 2x 2 tan x

by Shavana Gonzalez

Example 1: Verify, (sin x + cos x)2 = 1 + sin 2x:

Answer

(sin x + cos x)2 = 1 + sin 2x

(sin x + cos x)(sin x + cos x) = 1 + sin 2x

sin2 x + sin x cos x + sin x cos x + cos2 x = 1 + sin 2x

sin2 x + 2sin x cos x + cos2 x = 1 + sin 2x (combine like terms)

sin2 x + sin 2x + cos2 x = 1 + sin 2x

(substitution: double-angle identity)

sin2 x + cos2 x + sin 2x = 1 + sin 2x

1 + sin 2x = 1 + sin 2x

(Pythagorean identity)

Therefore, 1+ sin 2x = 1 + sin 2x, is verifiable.

Half-Angle Identities

The alternative form of double-angle identities are the half-angle identities.

Sine

? To achieve the identity for sine, we start by using a double-angle identity for cosine

cos 2x = 1 ? 2 sin2 x cos 2m = 1 ? 2 sin2 m cos 2x/2 = 1 ? 2 sin2 x/2 cos x = 1 ? 2 sin2 x/2 sin2 x/2 = (1 ? cos x)/2 sin2 x/2 = [(1 ? cos x)/2]

sin x/2 = ? [(1 ? cos x)/2]

[replace x with m] [replace m with x/2]

[solve for sin(x/2)]

Half-angle identity for sine

? Choose the negative or positive sign according to where the x/2 lies within the Unit Circle quadrants.

by Shavana Gonzalez

Half-Angle Identities (Continued)

Cosine

? To get the half-angle identity for cosine, we begin with another double-angle identity for cosine

cos 2x = 2cos2 x ? 1 cos 2m = 2 cos2 m ? 1 [replace x with m] cos 2x/2 = 2 cos2 x/2 -1 [replace m with x/2] cos x = 2 cos2 x/2 -1 cos2 x/2= (1 + cos x)/ 2 [solve for cos (x/2)] cos2 x/2 = [(1 + cos x)/ 2 ] cos x/2 = ?[(1 + cos x)/ 2]

Half-angle identity for cosine

? Again, depending on where the x/2 within the Unit Circle, use the positive and negative sign accordingly.

Tangent

? To obtain half-angle identity for tangent, we use the quotient identity and the halfangle formulas for both cosine and sine:

tan x/2 = (sin x/2)/ (cos x/2) tan x/2 = ? [(1 - cos x)/ 2] / ? [(1 + cos x)/ 2] tan x/2 = ? [(1 - cos x)/ (1 + cos x)]

(quotient identity) (half-angle identity) (algebra)

Half-angle identity for tangent

? There are easier equations to the half-angle identity for tangent equation

tan x/2 = sin x/ (1 + cos x)

1st easy equation

tan x/2 = (1 - cos x) /sin x

2nd easy equation.

Summary of Half-Angles

? Sine o sin x/2 = ? [(1 - cos x)/ 2]

? Cosine

o cos x/2 = ? [(1 + cos x)/ 2]

by Shavana Gonzalez

Summary of Half-Angles (Continued)

? Tangent o tan x/2 = ? [(1 - cos x)/ (1 + cos x)] o tan x/2 = sin x/ (1 + cos x) o tan x/2 = (1 - cos x)/ sin x

? Remember, pick the positive and negative sign according to where the x/2 lies. ? Note: sin x/2 ? sinx; cos x/2 ? cosx; tan x/2 ? tanx Example 2: Find exact value for, tan 30 degrees, without a calculator, and use the halfangle identities (refer to the Unit Circle). Answer

tan 30 degrees = tan 60 degrees/ 2 = sin 60/ (1 + cos 60) = ( 3 / 2) / (1+1/ 2) = ( 3 / 2) / (3 / 2) = ( 3 / 2) ? (2 / 3) = 3/3

by Shavana Gonzalez

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